Satisfaction relations for proper classes: Applications in logic and set theory

Journal of Symbolic Logic 78 (2):345-368 (2013)
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Abstract

We develop the theory of partial satisfaction relations for structures that may be proper classes and define a satisfaction predicate ($\models^*$) appropriate to such structures. We indicate the utility of this theory as a framework for the development of the metatheory of first-order predicate logic and set theory, and we use it to prove that for any recursively enumerable extension $\Theta$ of ZF there is a finitely axiomatizable extension $\Theta'$ of GB that is a conservative extension of $\Theta$. We also prove a conservative extension result that justifies the use of $\models^*$ to characterize ground models for forcing constructions

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10.2178/jsl.7802010

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Citations of this work

The small‐is‐very‐small principle.Albert Visser - 2019 - Mathematical Logic Quarterly 65 (4):453-478.

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References found in this work

Strong axioms of infinity and elementary embeddings.Robert M. Solovay - 1978 - Annals of Mathematical Logic 13 (1):73.
Sets and classes.Charles Parsons - 1974 - Noûs 8 (1):1-12.
Finite axiomatizability using additional predicates.W. Craig & R. L. Vaught - 1958 - Journal of Symbolic Logic 23 (3):289-308.
A system of axiomatic set theory—Part I.Paul Bernays - 1937 - Journal of Symbolic Logic 2 (1):65-77.
A relative consistency proof.Joseph R. Shoenfield - 1954 - Journal of Symbolic Logic 19 (1):21-28.

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